The Electromagnetic Properties of Electric
Guitar Pickups
Dan Carson, Prof. Steve Errede
University of Illinois at Urbana-Champaign
Image courtesy of http://upsenglish.files.wordpress.com/2009/01/electric-guitar-365-2-703153.jpg
Introduction• Pickups consist of several
thousand turns of thin copper wire wrapped around 6 magnetic poles.
• Pickups convert the mechanical vibrations of the guitar string into an electrical signal.
• The goal of this project is to understand the underlying physical processes at work in electric guitar pickups.
Image courtesy of http://www.electric-guitar-info.com/electric-guitar-pickups.html
• Correlating the physical and tonal properties allows us to build better sounding pickups.
4-parameter pickup model
( ) ( )L L LZ R i
( ) ( )C C CZ R i
L(f) C(f)
RL(f) RC(f)
• Single coil pickups can be modeled as LR_CR circuits.
• Lumped parameter model (i.e., all capacitive effects are lumped into the parameter C).
• Information about the electromagnetic properties of the pickup is contained in the frequency dependence of the 4 parameters.
Extracting the Parameter Values • Complex current and voltage data were measured across
the pickup from 5-20005 Hz in 10 Hz steps.
• Matlab least squares fitting program finds the values of the 4 parameters that minimize the square of the difference between the measured and calculated values of 16 constraints (power, impedance, current, and voltage, each with real and imaginary components, magnitude, and phase) at each data point.
• Redundant constraint equations were used to minimize the adverse effect of noise in the impedance data on the least squares fitting.
Converts output of function generator into a near constant current source
Measures complex voltage
Controls function generator
Sets frequency/amplitude of pickup excitations
Converts analog signals from the lock-ins to digital signals to be sent to the PC
Stores data
Measures complex current
• Complex impedance measurements and least squares fitting was carried out for several Gibson P90 pickups in the following configurations:
bare coil
coil + magnetically permeable materials
coil + magnetically permeable materials + magnets
complete pickup (w/ cover and base plate)
• Extracting the parameter values (L, C, RL, and RC) for each of these configurations revealed a lot of interesting physics!
Gibson P90 pickup configurations
Least Squares Fit Parameter Results
Results of the least squares fit parameters for a 1952 Gibson BR-9 Lap Steel P90 pickup.
• Resistance in inductive branch obeys power law (~f2).
• RL increases when magnetic materials are added, due to magnetic dissipation.
• Data is not reliable in the f < 100 Hz range, uncertainties are too large.
Resonances in Capacitance Data• Peaks appear in the C data in the 200-1000 Hz range only when magnetically permeable materials are added to the pickup.
• The magnetic domains of the magnetic materials can be modeled after a simple harmonic oscillator.
i i ioD D Dk m
• If the damping is small, the resonant frequency of the ith sized domain is
• The size of the resonances therefore should be proportional to the
number density ni of the ith sized domain. That’s what we believe we are seeing in the data!
Effective Relative Magnetic Permeability• By definition, the effective permeability is the ratio of the
inductance when magnetic materials are present to the inductance of the
• A pickup is not a perfect inductor, so we can only calculate the effective relative permeability (i.e., only a fraction of the magnetic flux created by the pickup magnets couples to the magnetically permeable materials).
effrel relf f f
effrel mag coilf L f L f
Our results (above) agree qualitatively with the complex permeability of single crystal magnetite (left).
Our results at very low frequencies (i.e., f < 100 Hz) are unreliable due to the large uncertainties in the fit parameters at these frequencies.
Permeability Results
Image courtesy of: Craik, Derek J. Magnetism: Principles and Applications. San Francisco: Wiley, 1997.
Future work• Investigate the origin if the ~f2 dependence of the
RL parameter.
• Take data in finer (1 Hz) steps and with less noise in order to better resolve the resonances in the C data.
• Investigate possible ways to on the expand the current model.
Image courtesy of http://upload.wikimedia.org/wikipedia/commons/d/de/Super_Humbucker_V-2_pickup_on_an_Ibanez_Studio_electric_guitar.jpg